Average-case complexity of a branch-and-bound algorithm for maximum independent set, under the G(n,p) random model
Abstract
We study average-case complexity of branch-and-bound for maximum independent set in random graphs under the G(n,p) distribution. In this model every pair (u,v) of vertices belongs to E with probability p independently on the existence of any other edge. We make a precise case analysis, providing phase transitions between subexponential and exponential complexities depending on the probability p of the random model.
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